If `G` is the geometric mean of `xa n dy` then prove that `1/(G^2-x^2)+1/(G^2-y^2)=1/(G^2)`

If G is the G.M between two positive numbers a and b.show that 1/(G^2-a^2)+1/(G^2-b^2)=1/G^2

If a is the A.M. of b and c and the two geometric mean are G_1 and G_2, then prove that G_1^3+G_2^3=2a b c

If G is the G.M. between two positive numbers a and b, show that (1)/(G^(2) - a^(2)) + (1)/(G^(2) - b^(2)) = (1)/(G^(2)) .

The geometric mean of the first n terms of the G.P. a,ar,ar^2 ,….is

If a,b,c are in G.P and x,y are the arithmetic mean of a and b aand b,c prove that a/x+c/y=2and 1/x+1/y=2/b.

If G_1 ,G_2 are geometric means , and A is the arithmetic mean between two positive no. then show that G_1^2/G_2+G_2^2/G_1=2A .

If two positive values of a variable be x_(1) and x_(2) and the arithmetic mean be A, geometric mean be G and the harmonic mean be H, then prove that G^(2)=AH

If x_1 and x_2 be any two positive variables and if the arithmetic mean of these two values be A, geometric mean be G and harmonic mean be H, then peove that G^2 = AH

If a curve is represented parametrically by the equation x=f(t) and y=g(t)" then prove that "(d^(2)y)/(dx^(2))=-[(g'(t))/(f'(t))]^(3)((d^(2)x)/(dy^(2)))

f is a strictly monotonic differentiable function with f^(prime)(x)=1/(sqrt(1+x^3))dot If g is the inverse of f, then g^(prime prime)(x)= a. (2x^2)/(2sqrt(1+x^3)) b. (2g^2(x))/(2sqrt(1+g^2(x))) c. 3/2g^2(x) d. (x^2)/(sqrt(1+x^3))